Motivated by the work [9], in this paper we investigate the infinite boundary value problem associated with the semilinear PDE Lu=f(u)+h(x){Lu=f(u)+h(x)} on bounded smooth domains Ω⊆ℝn{\Omega\subseteq\mathbb{R}^{n}}, where L is a non-divergence structure uniformly elliptic operator with singular lower-order terms. In the equation, f is a continuous non-decreasing function that satisfies the Keller–Osserman condition, while h is a continuous function in Ω that may change sign, and which may be unbounded on Ω. Our purpose is two-fold. First we study some sufficient conditions on f and h that would ensure existence of boundary blow-up solutions of the above equation, in which we allow the lower-order coefficients to be singular on the bound...
Abstract. In this paper, under some structural assumptions of weight function b(x) and nonlinear ter...
This article is concerned with the existence, uniqueness and numerical approx-imation of boundary bl...
We study the existence and nonexistence of positive solution to the problem $$\displaylines{ \Delt...
AbstractMotivated by the work [9], in this paper we investigate the infinite boundary value problem ...
The primary objective of the paper is to study the existence, asymptotic boundary estimates and uniq...
We consider the semilinear equation Δu = p(x)f(u) on a domain Ω ⊆ Rn, n ≥ 3, where f is a nonnegativ...
In this paper, for more general f, g and a, b, we obtain conditions about the existence and boundary...
(MS received ‘Received date’; ‘Accepted date’) In this paper, we show existence, uniqueness and exac...
We prove the existence of a large positive solution for the boundary value problems $$ \alignat 2 -\...
AbstractIn this paper, we show existence, uniqueness and exact asymptotic behavior of solutions near...
AbstractWe consider the equation Δu=p(x)f(u) where p is a nonnegative nontrivial continuous function...
Let b(x) be a positive function in a bounded smooth domain Ω ⊂ RN, and let f(t) be a positive non de...
AbstractIn this paper we consider the boundary blow-up problemΔu=f(u)inΩ,u(x)→∞asx→∂Ω,and its non-au...
37 ppInternational audienceWe study existence and uniqueness of solutions of (E 1) −∆u + µ |x| ^{-2}...
AbstractIn this paper we consider the elliptic boundary blow-up problems{Δu±g(|∇u|)=f(u)in Ω,u=∞on ∂...
Abstract. In this paper, under some structural assumptions of weight function b(x) and nonlinear ter...
This article is concerned with the existence, uniqueness and numerical approx-imation of boundary bl...
We study the existence and nonexistence of positive solution to the problem $$\displaylines{ \Delt...
AbstractMotivated by the work [9], in this paper we investigate the infinite boundary value problem ...
The primary objective of the paper is to study the existence, asymptotic boundary estimates and uniq...
We consider the semilinear equation Δu = p(x)f(u) on a domain Ω ⊆ Rn, n ≥ 3, where f is a nonnegativ...
In this paper, for more general f, g and a, b, we obtain conditions about the existence and boundary...
(MS received ‘Received date’; ‘Accepted date’) In this paper, we show existence, uniqueness and exac...
We prove the existence of a large positive solution for the boundary value problems $$ \alignat 2 -\...
AbstractIn this paper, we show existence, uniqueness and exact asymptotic behavior of solutions near...
AbstractWe consider the equation Δu=p(x)f(u) where p is a nonnegative nontrivial continuous function...
Let b(x) be a positive function in a bounded smooth domain Ω ⊂ RN, and let f(t) be a positive non de...
AbstractIn this paper we consider the boundary blow-up problemΔu=f(u)inΩ,u(x)→∞asx→∂Ω,and its non-au...
37 ppInternational audienceWe study existence and uniqueness of solutions of (E 1) −∆u + µ |x| ^{-2}...
AbstractIn this paper we consider the elliptic boundary blow-up problems{Δu±g(|∇u|)=f(u)in Ω,u=∞on ∂...
Abstract. In this paper, under some structural assumptions of weight function b(x) and nonlinear ter...
This article is concerned with the existence, uniqueness and numerical approx-imation of boundary bl...
We study the existence and nonexistence of positive solution to the problem $$\displaylines{ \Delt...